about fourier transform
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what is the best reconstruction in term of quality of the image when using fft2 and ifft2 without pre and post processing.
2 Kommentare
Sean de Wolski
am 22 Mär. 2011
What do you mean "What is the best reconstruction?" Explain your question and you'll get better answers.
si kijang
am 28 Mär. 2011
Antworten (2)
Walter Roberson
am 22 Mär. 2011
0 Stimmen
Are you asking: "If I have an image and I fft2() the image, and I ifft2() the result of that, then what is the maximum difference I should expect for any one pixel compared between the original and reconstructed image" ?
1 Kommentar
si kijang
am 28 Mär. 2011
David Young
am 28 Mär. 2011
The Discrete Fourier Transform has no parameters to manipulate. The difference between the original and the reconstructed images will always be very small, though non-zero because of rounding errors.
You could explore this experimentally with test code similar to this:
imsize = 100 + ceil(1000*rand);
img = rand(imsize);
ft = fft2(img);
recon = ifft2(ft);
max(abs(img(:)-recon(:)))
which typically produces a result of order 1e-15 on my system.
1 Kommentar
Walter Roberson
am 12 Apr. 2011
From one point of view at least, the parameter for fft would be the number of fft bins to use, and the best would be the same as the number of points along that dimension.
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